Asymptotic approach for a renewal-reward process with a general interference of chance |
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| Authors: | Rovshan Aliyev Ozlem Ardic |
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| Affiliation: | 1. Department of Probability Theory and Mathematical Statistics, Baku State University, AZ, Baku, Azerbaijan;2. Institute of Cybernetics, Azerbaijan National Academy of Sciences, AZ, Baku, Azerbaijan;3. Department of Industrial Engineering, TOBB University of Economics and Technology, Ankara, Turkey |
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| Abstract: | ![]()
ABSTRACTIn this study, a renewal-reward process with a discrete interference of chance is constructed and considered. Under weak conditions, the ergodicity of the process X(t) is proved and exact formulas for the ergodic distribution and its moments are found. Within some assumptions for the discrete interference of chance in general form, two-term asymptotic expansions for all moments of the ergodic distribution are obtained. Additionally, kurtosis coefficient, skewness coefficient, and coefficient of variation of the ergodic distribution are computed. As a special case, a semi-Markovian inventory model of type (s, S) is investigated. |
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| Keywords: | Asymptotic expansion Discrete interference of chance Ergodic distribution Moments Renewal-reward process |
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